1. Check if each of the following ODEs is an exact. If it is not an...

Check if each of the following ODEs is an exact. If it is not an exact...

Check if each of the following ODEs is an exact. If it is not an exact find an integrating factor to make it an exact. Then solve each of the following ODEs. (c) (6y2 −x2 + 3) dy/dx + (3x2 −2xy + 2) = 0 (d) (3xy + y2)dx + (x2 + xy)dy =

Check if each of the following ODEs is an exact. If it is not an exact...

Check if each of the following ODEs is an exact. If it is not an exact find an integrating factor to make it an exact. Then solve each of the following ODEs. (d) (3xy + y2)dx + (x2 + xy)dy = 0

engineering mathematics solve (3y2+2x+1)dx+(2xy+2y)dy=0 Find an integrating factor and solve the ode,tks.

engineering mathematics solve (3y2+2x+1)dx+(2xy+2y)dy=0 Find an integrating factor and solve the ode,tks.

Determine which of the following equations are separable. If it is separable, find its general solution....

Determine which of the following equations are separable. If it is separable, find its general solution. Then, match one of the differential equations to the slope field below and sketch the solution curve corresponding to an initial condition of y(0) = 0. (i) y0 = y−2x (ii) dy dx = −2x(y−3) (iii) y00 + 4y = 6cos(t) (iv)dy/dx=1/ y

solve the exact equation (7x+4y)dx+(4x+3y)dy=0 given -1<=x<=1,           -1<=y<=1 please explain details

solve the exact equation (7x+4y)dx+(4x+3y)dy=0 given -1<=x<=1,           -1<=y<=1 please explain details

Use an integrating factor to reduce the equation to an exact differential equation, then find general...

Use an integrating factor to reduce the equation to an exact differential equation, then find general solution. (x^2y)dx + y(x^3+e^-3y siny)dy = 0

1. Find the general solution of each of the following differential equations a.) y' − 4y...

1. Find the general solution of each of the following differential equations a.) y' − 4y = e^(2x) b.) dy/dx = 1/[x(y − 1)] c.) 2y'' − 5y' − 3y = 0

) Check that each of the following functions solves the corresponding differential equation, by computing both...

) Check that each of the following functions solves the corresponding differential equation, by computing both the left-hand side and right-hand side of the differential equation. (a) y = cos2 (x) solves dy/dx = −2 sin(x) √y (b) y = 4x + 1/x solves x dy dx + 2/x = y (c) y = e x 2+3 solves dy/dx = 2xy (d) y = ln(1 + x 2 ) solves e y dy dx = 2x

if not exact make it exact then Solve (ln sin y -3x^2) dy/dx + x cot...

if not exact make it exact then Solve (ln sin y -3x^2) dy/dx + x cot y + 4y =0 y = (Pi/2)=2

Solve the following exact DEs (a) y2 + 2xydy dx = 1 x2 (b) 2xey +...

Solve the following exact DEs (a) y2 + 2xydy dx = 1 x2 (b) 2xey + x2ey dy dx = sinx + xcosx (c) x2 dy dx + 2xy = 1 (d) (2x + sinxtany)−cosxsec2 ydy dx = 0. plese break them down in simple steps